NUMERICAL SOLUTIONS OF NONLINEAR PARABOLIC EQUATIONS WITH ROBIN CONDITION: GALERKIN APPROACH
NUMERICAL SOLUTIONS OF NONLINEAR PARABOLIC EQUATIONS WITH ROBIN CONDITION: GALERKIN APPROACH
H. Ali, MD. Kamrujjaman
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Abstract
In this paper, classical solutions of nonlinear parabolic partial di erential equations with the Robin boundary condition are approximated using the Galerkin nite element method (GFEM) which is associated with the combination of the Picard itera- tive scheme and -family of approximation. The uniqueness, convergence, and structural stability analysis of solutions are studied. It is proven that the iterative scheme of the numerical method is stable. To ensure the e ciency and accuracy of the method, the comparative study between the exact and approximate solutions both numerically and graphically are given by solving two nonlinear parabolic problems. A reliable error esti- mation also opens possibilities of acceptance of the method. The results con rmed the consistency of the method and ensured the convergence of solutions.
Keywords
Nonlinear, parabolic equations, convergence, stability, shock problem, GFEM.